Machine Learning: Naïve Bayes, Neural Networks, Clustering

CMSC 471 Machine Learning:Naïve Bayes, Neural Networks, Clustering Skim 20.5

TheNaïve BayesClassifier Some material adapted from slides by Tom Mitchell, CMU.

The Naïve Bayes Classifier • Recall Bayes rule: • Which is short for: • We can re-write this as:

Deriving Naïve Bayes • Idea: use the training data to directly estimate: • Then, we can use these values to estimate using Bayes rule. • Recall that representing the full joint probability is not practical. and

Deriving Naïve Bayes • However, if we make the assumption that the attributes are independent, estimation is easy! • In other words, we assume all attributes are conditionally independent given Y. • Often this assumption is violated in practice, but more on that later…

Deriving Naïve Bayes • Let and label Y be discrete. • Then, we can estimate and directly from the training data by counting! P(Sky = sunny | Play = yes) = ? P(Humid = high | Play = yes) = ?

Y Labels (hypotheses) j … … Attributes (evidence) X X X 1 i n The Naïve Bayes Classifier • Now we have: which is just a one-level Bayesian Network • To classify a new point Xnew:

The Naïve Bayes Algorithm • For each value yk • Estimate P(Y = yk) from the data. • For each value xij of each attribute Xi • Estimate P(Xi=xij | Y = yk) • Classify a new point via: • In practice, the independence assumption doesn’t often hold true, but Naïve Bayes performs very well despite it.

Learning P(BrainActivity | WordCategory) Pairwise Classification Accuracy: 85% People Words Animal Words Naïve Bayes Applications • Text classification • Which e-mails are spam? • Which e-mails are meeting notices? • Which author wrote a document? • Classifying mental states

Neural Networks Some material adapted from lecture notes by Lise Getoor and Ron Parr Adapted from slides by Tim Finin and Marie desJardins.

Neural function • Brain function (thought) occurs as the result of the firing of neurons • Neurons connect to each other through synapses, which propagate action potential (electrical impulses) by releasing neurotransmitters • Synapses can be excitatory (potential-increasing) or inhibitory (potential-decreasing), and have varying activation thresholds • Learning occurs as a result of the synapses’ plasticicity: They exhibit long-term changes in connection strength • There are about 1011 neurons and about 1014 synapses in the human brain(!)

Biology of a neuron

Brain structure • Different areas of the brain have different functions • Some areas seem to have the same function in all humans (e.g., Broca’s region for motor speech); the overall layout is generally consistent • Some areas are more plastic, and vary in their function; also, the lower-level structure and function vary greatly • We don’t know how different functions are “assigned” or acquired • Partly the result of the physical layout / connection to inputs (sensors) and outputs (effectors) • Partly the result of experience (learning) • We really don’t understand how this neural structure leads to what we perceive as “consciousness” or “thought” • Artificial neural networks are not nearly as complex or intricate as the actual brain structure

Comparison of computing power • Computers are way faster than neurons… • But there are a lot more neurons than we can reasonably model in modern digital computers, and they all fire in parallel • Neural networks are designed to be massively parallel • The brain is effectively a billion times faster

Output units Hidden units Input units Neural networks • Neural networks are made up of nodes or units, connected by links • Each link has an associated weight and activation level • Each node has an input function (typically summing over weighted inputs), an activation function, and an output Layered feed-forward network

Model of a neuron • Neuron modeled as a unit i • weights on input unit j to i, wji • net input to unit i is: • Activation function g() determines the neuron’s output • g() is typically a sigmoid • output is either 0 or 1 (no partial activation)

“Executing” neural networks • Input units are set by some exterior function (think of these as sensors), which causes their output links to be activated at the specified level • Working forward through the network, the input function of each unit is applied to compute the input value • Usually this is just the weighted sum of the activation on the links feeding into this node • The activation function transforms this input function into a final value • Typically this is a nonlinear function, often a sigmoid function corresponding to the “threshold” of that node

Learning rules • Rosenblatt (1959) suggested that if a target output value is provided for a single neuron with fixed inputs, can incrementally change weights to learn to produce these outputs using the perceptron learning rule • assumes binary valued input/outputs • assumes a single linear threshold unit

Perceptron learning rule • If the target output for unit i is ti • Equivalent to the intuitive rules: • If output is correct, don’t change the weights • If output is low (oi=0, ti=1), increment weights for all the inputs which are 1 • If output is high (oi=1, ti=0), decrement weights for all inputs which are 1 • Must also adjust threshold. Or equivalently assume there is a weight w0i for an extra input unit that has an output of 1.

Perceptron learning algorithm • Repeatedly iterate through examples adjusting weights according to the perceptron learning rule until all outputs are correct • Initialize the weights to all zero (or random) • Until outputs for all training examples are correct • for each training example e do • compute the current output oj • compare it to the target tj and update weights • Each execution of outer loop is called an epoch • For multiple category problems, learn a separate perceptron for each category and assign to the class whose perceptron most exceeds its threshold

Representation limitations of a perceptron • Perceptrons can only represent linear threshold functions and can therefore only learn functions which linearly separate the data. • i.e., the positive and negative examples are separable by a hyperplane in n-dimensional space <W,X> -  = 0 > 0 on this side < 0 on this side

Perceptron learnability • Perceptron Convergence Theorem: If there is a set of weights that is consistent with the training data (i.e., the data is linearly separable), the perceptron learning algorithm will converge (Minicksy & Papert, 1969) • Unfortunately, many functions (like parity) cannot be represented by LTU

Learning: Backpropagation • Similar to perceptron learning algorithm, we cycle through our examples • if the output of the network is correct, no changes are made • if there is an error, the weights are adjusted to reduce the error • The trick is to assess the blame for the error and divide it among the contributing weights

activation of hidden unit j (Ti – Oi) derivative of activation function Output layer • As in perceptron learning algorithm, we want to minimize difference between target output and the output actually computed

Hidden layers • Need to define error; we do error backpropagation. • Intuition: Each hidden node j is “responsible” for some fraction of the error I in each of the output nodes to which it connects. • I divided according to the strength of the connection betweenhidden node and the output node and propagated back to provide the j values for the hidden layer: update rule:

Backprogation algorithm • Compute the  values for the output units using the observed error • Starting with output layer, repeat the following for each layer in the network, until earliest hidden layer is reached: • propagate the  values back to the previous layer • update the weights between the two layers

Backprop issues • “Backprop is the cockroach of machine learning. It’s ugly, and annoying, but you just can’t get rid of it.” Geoff Hinton • Problems: • black box • local minima

Unsupervised Learning: Clustering Some material adapted from slides by Andrew Moore, CMU. Visit http://www.autonlab.org/tutorials/ for Andrew’s repository of Data Mining tutorials.

Unsupervised Learning • Supervised learning used labeled data pairs (x, y) to learn a function f : X→Y. • But, what if we don’t have labels? • No labels = unsupervised learning • Only some points are labeled = semi-supervised learning • Labels may be expensive to obtain, so we only get a few. • Clustering is the unsupervised grouping of data points. It can be used for knowledge discovery.

Clustering Data

K-Means Clustering • K-Means ( k , data ) • Randomly choose k cluster center locations (centroids). • Loop until convergence • Assign each point to the cluster of the closest centroid. • Reestimate the cluster centroids based on the data assigned to each.

K-Means Animation Example generated by Andrew Moore using Dan Pelleg’s super-duper fast K-means system: Dan Pelleg and Andrew Moore. Accelerating Exact k-means Algorithms with Geometric Reasoning. Proc. Conference on Knowledge Discovery in Databases 1999.

Problems with K-Means • Very sensitive to the initial points. • Do many runs of k-Means, each with different initial centroids. • Seed the centroids using a better method than random. (e.g. Farthest-first sampling) • Must manually choose k. • Learn the optimal k for the clustering. (Note that this requires a performance measure.)

Same-cluster constraint (must-link) Different-cluster constraint (cannot-link) Problems with K-Means • How do you tell it which clustering you want? • Constrained clustering techniques

Machine Learning: Naïve Bayes, Neural Networks, Clustering

Machine Learning: Naïve Bayes, Neural Networks, Clustering

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